Let a, b and c be in geometric progression. If the roots of the equation `ax^(2) +2bx+c= 0` are `alpha and beta` while those of `cx^(2) + 2bx+a= 0` are `gamma and delta` then

If a, b and c are in geometric progression and the roots of the equations ax^(2)+2bx+c=0 are alpha and beta and those cx^(2)+2bx+a=0 are gamma and delta , then : a) alpha ne beta ne gamma ne delta b) alpha ne beta and gamma ne delta c) alpha=abeta=cgamma=cdelta d) alpha=beta and gamma ne delta

If the roots of the equation x ^(2) + 2 bx + c =0 are alpha and beta, then b ^(2) - c is equal to

If the roots of the equation x^(2) - bx + c = 0 are two consecutive integers, then b^(2) - 4c is

Let a, b, c gt 0 . Then prove that both the roots of the equation ax^(2)+bx+c=0 has negative real parts.

If sin alpha and cos alpha are the roots of the equition ax^(2) + bx + c = 0 , then

If alpha and beta are the roots of the equation x ^(2) + alpha x + beta = 0, then